On the large-scale geometry of diffeomorphism groups of 1-manifolds

Abstract

We apply the framework of Rosendal to study the large-scale geometry of the topological groups +k(M1), consisting of orientation-preserving Ck-diffeomorphisms (for 1≤ k≤∞) of a compact 1-manifold M1 (=I or S1). We characterize the relative property (OB) in such groups: A⊂eq+k(M1) has property (OB) relative to +k(M1) if and only if f∈ Ax∈ M1| f'(x)|<∞ and f∈ Ax∈ M1|f(j)(x)|<∞ for every integer 2≤ j≤ k. We deduce that +k(M1) has the local property (OB), and consequently a well-defined non-trivial quasi-isometry class, if and only if k<∞. We show that the groups +1(I) and +1(S1) are quasi-isometric to the infinite-dimensional Banach space C[0,1].